Category of functors/Related Articles: Difference between revisions
Jump to navigation
Jump to search
imported>Jitse Niesen (start) |
No edit summary |
||
Line 23: | Line 23: | ||
{{r|Yoneda lemma}} | {{r|Yoneda lemma}} | ||
{{r|Nobuo Yoneda}} | {{r|Nobuo Yoneda}} | ||
==Articles related by keyphrases (Bot populated)== | |||
{{r|Middle East agreements}} | |||
{{r|Infectious Diseases (human)}} | |||
{{r|Affine scheme}} |
Latest revision as of 17:00, 25 July 2024
- See also changes related to Category of functors, or pages that link to Category of functors or to this page or whose text contains "Category of functors".
Parent topics
- Category [r]: Add brief definition or description
- Category theory [r]: Loosely speaking, a class of objects and a collection of morphisms which act upon them; the morphisms can be composed, the composition is associative and there are identity objects and rules of identity. [e]
- Functor [r]: Add brief definition or description
- Representable functor [r]: Add brief definition or description
- Natural transformation [r]: Add brief definition or description
- Scheme theory [r]: Add brief definition or description
- Scheme (mathematics) [r]: Topological space together with commutative rings for all its open sets, which arises from 'glueing together' spectra (spaces of prime ideals) of commutative rings. [e]
- Presheaf [r]: Add brief definition or description
- Yoneda lemma [r]: Add brief definition or description
- Nobuo Yoneda [r]: Add brief definition or description
- Middle East agreements [r]: The wide range of public and secret correspondence, treaties, United Nations Security Council resolutions, announcements from high-level conferences and other negotiated approaches to stability in the Middle East. [e]
- Infectious Diseases (human) [r]: Clinically evident disease resulting from the presence of pathogenic microbial agents, including pathogenic viruses, pathogenic bacteria, fungi, protozoa, multicellular parasites, and aberrant proteins known as prions. [e]
- Affine scheme [r]: Spectrum of a commutative ring R, denoted by Spec(R), is the set of all proper prime ideals of R. [e]